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# Longest common contiguous subsequence - algorithm

My question is simple: Is there an O(n) algorithm for finding the longest contiguous subsequence between two sequences A and B? I searched it, but all the results were about the LCS problem, which is not what I'm seeking.

Note: if you are willing to give any sample code, you are more than welcome to do so, but please, if you can, in C or C++.

Edit: Here is an example:

``````A: { a, b, a, b, b, b, a }
B: { a, d, b, b, b, c, n }
longest common contiguous subsequence: { b, b, b }
``````
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If you aren't seeking lcs please supply a trivial example of what you are seeking – Woot4Moo Dec 25 '12 at 18:12
This is the same as the longest common substring. – fgb Dec 25 '12 at 18:21
that looks the same as LCS. Or is it LCS with the additional constraint that the sequence must be a repetition of the same symbols? i.e. `{a,b,c,d,d}` and `{d,d,a,b,c}` yields `{d,d}`? – marcus erronius Dec 25 '12 at 18:23
Clarifying fgb's comment for other newbs like me: Longest Common Contiguous Subsequence = Longest Common String. As Wikipedia says, " unlike substrings, subsequences are not required to occupy consecutive positions within the original sequences". Hence "contiguous subsequence" or "consecutive subsequence" can be replaced by "substring". – The Red Pea Oct 27 '15 at 18:22

Yes, you can do this in linear time. One way is by building suffix trees for both the pattern and the text and computing their intersection. I can't think of a way to do this without involving suffix trees or suffix arrays, though.

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The solution with suffix trees is not linear. – Rontogiannis Aristofanis Dec 25 '12 at 18:25
@RondogiannisAristophanes yes, it is. It's linear in n + m, so it's linear in n if n = m. – Haile Dec 25 '12 at 18:40
It takes linear time to build a suffix tree. (Surprising, but true.) Suffix trees take linear space. Walking two suffix trees simultaneously to find the longest common string takes linear time. – tmyklebu Dec 25 '12 at 18:56

that is what you are looking for:

KMP algorithm `c` implementation

the basic theory:

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This sounds interesting. Could you please briefly explain this algorithm? – Rontogiannis Aristofanis Dec 25 '12 at 18:27
Didn't you understand the wiki summary? in corman algo book there is a nice explanation as well – 0x90 Dec 25 '12 at 18:31
KMP would not be linear, since you need to run it more than one time. You need a suffix tree. – Haile Dec 25 '12 at 18:38
The fastest solution I can think of that uses KMP will be quadratic. Can you elaborate? – tmyklebu Dec 25 '12 at 18:59

I am not sure whether there exists an O(n) algorithm. Here is a O(n*n) dynamic solution, maybe it is helpful to you. Let lcs_con[i][j] represent the longest common contiguous subsequence which end with element A_i from array A and B_j from array B. Then we can get the equations below:

``````lcs_con[i][j]=0 if i==0 or j==0
lcs_con[i][j]=0 if A_i != B_j
lcs_con[i][j]=lcs_con[i-1][j-1] if A_i==B_j
``````

we can record the maximum of lcs_con[i][j] and the ending index during the calculation to get the longest common contiguous subsequence. The code is below:

``````#include<iostream>

using namespace std;

int main()
{
char A[7]={'a','b','a','b','b','b','a'};
char B[7]={'a','d','b','b','b','c','n'};

int lcs_con[8][8];
memset(lcs_con,0,8*8*sizeof(int));

int result=-1;
int x=-1;
int y=-1;

for(int i=1;i<=7;++i)
for(int j=1;j<=7;++j)
{
if(A[i-1]==B[j-1])lcs_con[i][j]=lcs_con[i-1][j-1]+1;
else lcs_con[i][j]=0;

if(lcs_con[i][j]>result)
{
result=lcs_con[i][j];
x=i;
y=j;
}
}

if(result==-1)cout<<"There are no common contiguous subsequence";
else
{
cout<<"The longest common contiguous subsequence is:"<<endl;
for(int i=x-result;i<x;i++)cout<<A[i];
cout<<endl;
}

getchar();
getchar();

return 0;
}
``````

Hope it helps!

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